Method and device for building a variable length error-correcting code

ABSTRACT

The invention relates to a variable-length error-correcting (VLEC) code construction method, in which the main steps are: defining all the needed parameters, generating a code having a fixed length L 1 , storing in a set W thus obtained all the possible L1-tuples distant of the minimum diverging distance d ‘min! from the codewords (one extra-bit being affixed at the end of all words if the new set W thus obtained is not empty), deleting all words of W that do not satisfy a distance criterion with all codewords, and verifying that all words of the final set W satisfy another distance criterion. Assuming that all distributions of number of codewords for the best VLEC codes have a similar curve allure of a bell shape type, it is then proposed, according to the invention, to define an optimal length value Lm until which the number of codewords increases with their length, whereas it decreases after said value Lm. According to this new construction method, called Lm optimization, it is possible to apply the so-called “Ls optimization” method with avoiding the edges of the curve and to work locally, wherein Ls represents a length to which the thod skips back in the codeword deletion stage.

FIELD OF TIRE INVENTION

The present invention relates to a method of building a variable length error code, said method comprising the steps of:

(1) initializing the needed parameters: minimum and maximum length of codewords L₁ and L_(max) respectively, free distance d_(free) between each codeword (said distance d_(free) being for a VLEC code C the minimum Hamming distance in the set of all arbitrary extended codes), required number of codewords S;

(2) generating a fixed length code C of length L₁ and minimal distance b_(min), with b_(min)=min{b_(k); k=1, 2, . . . , R}, b_(k)=the distance associated to the codeword length L_(k) of code C and defined as the minimum Hamming distance between all codewords of C with length L_(k), and R=the number of different codeword lengths in C, said generating step creating a set W of n-bit long words distant of d;

(3) listing and storing in the set W all the possible L₁-tuples at the distance of d_(min) from the codewords of C (said distance d_(min) for a VLEC code C being the minimum value of all the diverging distances between all possible couples of different-length codewords of C), and, if said set W is not empty, doubling the number of words in W by affixing at the end of all words one extra bit, said storing step therefore replacing the set W by a new one having twice more words than the previous one and the length of each one of these words being L₁+1;

(4) deleting all the words of the set W that do not satisfy the c_(min) distance with all codewords of C, said distance c_(min) being the minimum converging distance of the code C;

(5) in the case where no word is found or the maximum number of bits is reached, reducing the constraint of distance for finding more words; (6) controlling that all words of the set W are distant of b_(min), the found words being then added to the code C;

(7) if the required number of codewords has not been reached, repeating the steps (1) to (6) until the method finds either no further possibility to continue or the required number of codewords;

(8) if the number of codewords of C is greater than S, calculating on the basis of the structure of the VLEC code, the average length AL obtained by weighting each codeword length with the probability of the source, said AL becoming the AL_(min), if it is lower than AL_(min), with AL_(min)=the minimum value of AL, and the corresponding code structure being kept in memory.

The invention also relates to a corresponding device.

BACKGROUND OF THE INVENTION

A classical communication chain, illustrated in FIG. 1, comprises, for coding the signals coming from a source S, a source coder 1 (SCOD) followed by a channel coder 2 (CCOD) and, after the transmission of the coded signals thus obtained through a channel 3, a channel decoder 4 (CDEC) and a source decoder 5 (SDEC). The decoded signals are intended to be sent towards a receiver. Variable-length codes (VLC) are classically used in source coding for their compression capabilities, and the associated channel coding techniques combat the effects of the real transmission channel (such as fading, noise, etc.). However, since source coding is intended to remove redundancy and channel coding to re-introduce it, it has been investigated how to efficiently coordinate these techniques in order to improve the overall system while keeping the complexity at an acceptable level.

Among the solutions proposed in such an approach, the variable-length error correcting (VLEC) codes present the advantage to be variable-length while providing error correction capabilities, but building these codes is rather time consuming for short alphabets (and become even prohibitive for higher length alphabets sources), and the construction complexity is also a drawback, as it will be seen.

First, some definitions and properties of the classical VLC must be recalled. A code C is a set of S codewords {c₁, c₂, c₃, . . . , c_(i), . . . c_(S)}, for each of which a length l_(i)=|c_(i)| is defined, with l₁≦l₂≦l₃≦ . . . ≦l_(i)≦ . . . ≦l_(S) without any loss of generality. The number of different codeword lengths in the code C is called R, with obviously R≦S, and these lengths are denoted as L₁, L₂, L₃, . . . , L_(i), . . . L_(R), with L₁<L₂<L₃< . . . <L_(R). A variable-length code, or VLC, is then the structure denoted by (s₁@L₁, s₂@ L₂, s₃@ L₃, . . . , s_(R)@ L_(R)), which corresponds to s₁ codewords of length L₁, s₂ codewords of length L₂, s₃ codewords of length L₃, . . . , and s_(R) codewords of length L_(R). When using a VLC, the compression efficiency, for a given source, is related to the number of bits necessary to transmit symbols from said source. The measure used to estimate this efficiency is often the average length AL of the code, i.e. the average number of bits needed to transmit a word, and said average length is given, when each symbol a_(i) is mapped to the codeword c_(i), by the following relation (1): $\begin{matrix} {{AL} = {\sum\limits_{i = 1}^{i = s}{l_{i} \cdot {P\left( a_{i} \right)}}}} & (1) \end{matrix}$ which is equivalent to the relation (2): $\begin{matrix} {{AL} = {\sum\limits_{i = 1}^{R}{L_{i} \cdot \left( {\sum\limits_{j = {{r{(i)}} + 1}}^{j = {r{({i + 1})}}}{P\left( a_{i} \right)}} \right)}}} & (2) \end{matrix}$ where, for a data source A, the S source symbols are denoted by {a₁, a₂, a₃, . . . , a_(S)} and P(a_(i)) is the respective probability of occurrence of each of these symbols, with ΣP(a_(i))=1 (from i=1 to i=S). If AL_(min) denotes the minimal value for the average length AL, it is easy to see that when AL_(min), is reached, the symbols are indexed in such a way that P(a₁)≧P(a₂)≧P(a₃)≧ . . . ≧P(a_(i))≧ . . . P(a_(S)). In order to encode the data in such a way that the receiver can decode the coded information, the VLC must satisfy the following properties: to be non-singular (all the codewords are distinct, i.e. no more than one source symbol is allocated to one codeword) and to be uniquely decodable (i.e. it is possible to map any string of codewords unambiguously back to the correct source symbols, without any error).

An introduction and a presentation of different distances that are useful when reviewing some general properties of the VLC codes will then help to recall the notion of error-correcting property used in the VLEC code theory:

(a) Hamming weight and distance: if w is a word of length n with w=(w₁, w₂, . . . , w_(n)), the Hamming weight of w, or simply weight, is the number W(w) of non-zero symbols in w: $\begin{matrix} {{W(w)} = {\sum\limits_{i = 1}^{i = n}\frac{w_{i}}{w_{i}}}} & (3) \end{matrix}$ and, if w₁ and w₂ are two words of equal length n with w_(i)=(w_(i1), w_(i2), w_(i3), . . . , w_(in)) and i=1 or 2, the Hamming distance (or, simply, distance) between w₁ and w₂ is the number of positions in which w₁ and w₂ differ (for example, for the binary case, it is easy to see that: H(w ₁ ,w ₂)=W(w ₁ +w ₂)  (4) where the addition is modulo-2). However, the Hamming distance is by definition restricted to fixed-length codes, and other definitions will be defined before considering VLEC codes.

(b) let f_(i)=w₁ ^(i) w₂ ^(i) . . . w_(n) ^(i) be a concatenation of n words of a VLEC code C, then the set F_(N)={f_(i):|f_(i)|=N} is called the extended code of C of order N.

(c) minimum block distance and overall minimum block distance: the minimum block distance b_(k) associated to the codeword length L_(k) of a VLEC code C is defined as the minimum Hamming distance between all distinct codewords of C with the same length L_(k): b _(k)=min{H(c _(i) ,c _(j)):c _(i) ,c _(j) εC,i≠,|c _(i) |=|c _(j) |=L _(k)} for k=1, . . . , R  (5) and the overall minimum block distance b_(min) of said VLEC code C, which is the minimum block distance value for every possible length L_(k), is defined by: b_(min)=min{b _(k):k=1, . . . R}  (6)

(d) diverging distance and minimum diverging distance: the diverging distance between two codewords of different length c =x i 1x_(i) ₂ and cj=x_(j1) x j2j of a VLEC code C, where c_(i), c_(j)εC, l_(i)=|c_(j)| and l_(j)=|c_(j)| with l_(i)>l_(j), is defined by: D(c i,c_(j))=H(x _(] Xi) ₂ Xit; I Xi XJ2 x _(..jtj) ()7) i.e. it is also the Hamming distance between a l_(j)-length codeword and the l_(j)-length prefix of a longer codeword, and the minimum diverging distance d_(min) of said VLEC code C is the minimum value of all the diverging distances between all possible couples of codewords of C of unequal length: d _(min)=min{D(c _(i) ,c _(j)):c _(i) ,c _(j) εC,|c _(i) |≠|c _(j)|}  (8)

(e) converging distance and minimum converging distance: the converging distance between two codewords of different length ci=x_(i1) x_(i2) . . . l x i2 . . . . xi.X

and Ci=Xj X J2 .... Xj

of a VLEC code C, where |c_(i)|=l_(i)>|c_(j)|=l_(j), is defined by: C(ci, cj)=H (Xiei -ij+1 XltI-tj+₂ . . . . X11 IX] XJ2 . . . . XXtj ) (9) i.e. it is also the Hamming distance between a l_(j)-length codeword and the l_(j)-length suffix of a longer codeword, and the minimum converging distance of said VLEC code C is the minimum value of all the converging distances between all possible couples of C of unequal length: c _(min)=min{C(c _(i) ,c _(j)):c _(i) ,c _(j) εC,|c _(i) |≠|c _(j)|}  (10)

(f) free distance: the free distance d_(free) of a code is the minimum Hamming distance in the set of all arbitrary long paths that diverge from some common state S_(i) and converge again in another common state S_(j), with j>i: d _(free)=min{H(f _(i) ,f _(j)):f _(i) ,f _(j) εF _(N) ,N=1,2, . . . ,∞}  (11)

Following the structure model used for a VLC, it is therefore possible to describe the structure of the VLEC code C by the notation: S ₁@L₁,b₁;S₂@L₂,b₂; . . . ;S_(R)@L_(R),b_(R);d_(min),c_(min)  (12) where there are s_(i) codewords of length L_(i) with minimum block distance b_(i), for all i=1, 2, . . . R, (it is recalled that R is the number of different codeword lengths) and minimum diverging and converging distances d_(min) and c_(min). The most important parameter of a VLEC code is its free distance d_(free), which influences greatly its performance in terms of error-correcting capabilities, and it can be shown that the free distance of a VLEC code is bounded by: d _(free)≧min(b _(min) ,d _(min) +c _(min))  (13)

These definitions being recalled, the state-of-the-art in VLEC codes construction will be now described more easily. The first types of VLEC codes, called α-prompt codes and introduced in 1974, and an extension of this family, called α_(t) ₁ _(,t) ₂ _(, . . . , t) _(R) -prompt codes, have both the same essential property: if one denotes by α(c_(i)) the set of words that are closer to c_(i) than to any codeword c_(j), with j≠i, no sequence in α(c_(i)) is a prefix of a sequence in another α(c_(i)). The construction of these codes is very simple, and the construction algorithm is adjustable by the number of codewords at each length, which makes possible to find the best prompt code for a given source and a given d_(free). However, this best code performs poorly in terms of compression performance.

A more recent construction, allowing the construction of a VLEC code from the generator matrix of a fixed-length linear block code, was proposed in the document “Variable-length error-correcting codes” by V. Buttigieg, Ph.D.Thesis, University of Manchester, England, 1995. Called code-anticode construction, this algorithm relies on line combinations and column permutations to form an anticode at the rightmost column. Once the code-anticode generator matrix is obtained, the VLEC code is simply obtained by a matrix multiplication.

This technique has however several drawbacks. First, there is no explicit method to find the needed line combinations and column permutations to obtain the anticode. Moreover, the construction does not take into account the source statistics and, consequently, often reveals itself sub-optimal (one can find a code with smaller average length by a post-processing on the VLEC code). In the same document, the author has then proposed an improved method, called Heuristic method, that is based on a computer search for building a VLEC code giving the better known compression rate for a specified source and a given protection against errors, i.e. a code C with specified overall minimum block, diverging and converging distances (and hence a minimum value for d_(free)) and with codeword lengths matched to the source statistics so as to obtain a minimum average codeword length for the chosen free distance and the specified source (in practice, one takes: b_(min)=d_(min)+c_(min)=d_(free), and: d_(min)=[d_(free)/2].

The main steps of this Heuristic method, which uses the following parameters: minimum length L₁ of codewords, maximum length L_(max) of codewords, free distance d_(free) between each codeword, number S of codewords required, are now described with reference to the flowcharts of FIGS. 2 to 4.

To start the computer search (“Start”), all the needed parameters must be first specified: L₁ (the minimum codeword length, which must be at least equal to or greater than the minimum diverging distance required), L_(max) (the maximum codeword length), the different distances between codewords (d_(free), b_(min), d_(min), c_(min)), and S (the number of codewords required by the given source), and some relations are set when choosing these parameters: L_(l)≧d_(min) b_(min)=d_(free) d _(min) +c _(min) =d _(free)

The first phase of the algorithm, referenced 11, is then performed: it consists in the generation of a fixed length code (put initially in C) of length L₁ and minimal distance b_(min), with a maximum number of codewords. This phase is in fact an initialization, performed for instance by means of an algorithm such as the greedy algorithm (GA), presented in FIG. 5, or the majority voting algorithm (MVA), presented in FIG. 7, or a new proposed variation, denoted by GAS (Greedy Algorithm by Step), which consists of a variation of the two above mentioned ones. The GAS consists in the search method used in the GA, where instead of deleting half of the codewords, only the last codeword of the group is deleted. These two algorithms are useful to create a set W of n-bit long words distant of d (in practice, it may be noted that the MVA finds more words than the GA, but it asks too much time for only a small improvement of the compression capacity, as shown in the tables of FIGS. 6 and 8, which compare, respectively for the GA and for the MVA, the best code structures obtained with different values of d_(free) for the 26-symbol English source defined in the table of FIG. 9.

The second phase of the algorithm, corresponding to the elements referenced 21 to 24 (21+22=operation “A0”; 23+24=operation “A2”) in FIG. 2, consists in listing and storing (step 21) in a set called W all the possible L₁-tuples at the distance of d_(min) from the codewords in C. If d_(min)≧b_(min), then W is empty. If this set W of all the words satisfying the minimum diverging distance to the current code is not empty (reply NO to the test 22: |w|=0?), the number of words in W is doubled by increasing the length of the words by one bit by affixing first a “0” and then a “1” to the rightmost position of all the words in W (step 24), except if the maximum number of bits is exceeded (reply YES to the test 23). At the output of said step 24, this modified set W has twice more words than the previous W, and the length of each one is L₁+1.

The third phase of the algorithm, corresponding to the elements 31 to 35 (=operation “A3” in FIG. 2), consists in deleting (step 31) all the words of set W that do not satisfy the c_(min) distance (minimum converging distance) with all the codewords of C (i.e. in keeping and storing in a new W only the words which satisfy said minimum converging distance, the other ones being discarded). At this point, the new set W is a set of words which, when compared to the codewords of C, satisfy the required minimum diverging and converging distances (both d_(min) and c_(min) distances) with the codewords of C. If that new set W is not empty (reply NO to the test 32: |W|=0?) one selects in W (step 33) the maximum number of words to satisfy the minimum block distance, in order to ensure that all the words of the set W, being of the same length, have a minimum distance at least equal to b_(min). At the end of this step 33, realized with the GA or the MVA (note that in this case, the initial set used for the GA or the MVA is the current W and not a n-tuples set), the words thus obtained are added (step 34) to the codewords already in C.

If no word is found (i.e. W is empty) at the end of the step 21 (reply YES to the test 22: |W|=0?) or if the maximum number of bits is reached or exceeded (reply YES to the test 23), one enters the fourth phase of the algorithm (steps 41 to 46, illustrated in FIG. 3 and also designated by the operation “A1” in said figure), which is used in order to unjam the process by inserting more liberty of choice, more particularly by affixing to all words in W extra bits (several bits at the same time) such that the new group contains more bits than the old one. If there are enough codewords in the last group (successive tests 41 and 42, for verifying the number of codewords in the last group, and if there are previous groups), some of them are deleted from said group (as described above), such deletions allowing to reduce the distance constraint and to find more codewords than before. As a matter of fact, the classical Heuristic method thus described begins with the maximum of codewords with the short length, maps them with the high probability symbols and tries to obtain a good compression rate, but sometimes the size of the small lengths sets are incompatible with the required number of codewords S. In this optic, easing a few codewords provides more freedom degrees and allows to reach a position where the initial requirements on distance and number of symbols for the code can be met. This deletion process is repeated until it remains a maximum of one codeword for each length. If W is empty at the end of the step 31 (reply YES to the test 32: |W|=0?), the steps 23, 24, 31, 32 are repeated. If the required number of codewords has not been reached (reply NO to the test 35 provided at the end of this third phase), the steps 21 to 24 and 31 to 35 must be repeated until said steps find that either there are no further possible words to be found or the required number of codewords is reached.

If said required number of codewords has been reached (i.e. the number of codewords of C is equal to or greater than S (reply YES to the test 35), the structure of the VLEC code thus obtained is used in a fifth part, including the steps 51 to 56 (illustrated in FIG. 4, and also designated by the operation “A4” in said figure), in order to calculate the average length AL. This is done by weighting each codeword length with the probability of the source, and comparing it to the current best one. If said average length AL of this VLEC code is lower than the minimized value of AL (=AL_(min)), this AL becomes the AL_(min), and this new AL value and the corresponding code structure are kept in the memory (step 51). These steps 51 and following (fifth part; operation “A4”) allow to come back, within the algorithm, towards previous groups, while the other phases of said algorithm are always performed on the current group. The stepsize for such a feedback operation is one, i.e. this feedback action can be considered as exhaustive.

To continue this search of the best VLEC code, it is necessary to avoid keeping the same structure, which would lead to a loop in the algorithm. The last added group of the current code is deleted (steps 52, 53), the deletion of shorter length codewords allowing to find more longer length codewords (test 54: number of codewords in group greater than 1?), and some codewords (half the amount for the GVA; the “best” one for the MVA) of the previous group are deleted (step 55), in order to re-loop (step 56) the algorithm at the beginning of the step 21 (see FIG. 2) and find different VLEC structures (the number of deleted codewords depends on which method is used for selecting the words: if the GA method is used and one wants to obtain a linear code, it is necessary to delete half of the codewords, while with the MVA method only one codeword, the best one, is deleted, i.e. the one that allows to find the more codewords in the next group).

However, the Heuristic method thus described often considers very unlikely code structures or proceeds with such a care (in order not to miss anything) that a great complexity is observed in the implementation of said method, which moreover is rather time consuming and can thus become prohibitive. It has therefore been proposed, in a European patent application filed on Oct. 23, 2002, with the filing number 02292624.0 (PHFR020110), an improved construction method with which it is possible to gain in complexity by avoiding these drawbacks, said method of building a variable length error code comprising, more precisely, the steps of:

(1) initializing the needed parameters: minimum and maximum length of codewords L₁ and L_(max) respectively, d_(free) distance de between each codeword (said distance d_(free) being for a VLEC code C the minimum Hamming distance in the set of all arbitrary extended codes), required number of codewords S;

(2) generating (step 11) a fixed length code C of length L₁ and minimal distance b_(min), with b_(min)=min{b_(k); k=1, 2, . . . , R}, b_(k)=the distance associated to the codeword length L_(k) of code C and defined as the minimum Hamming distance between all codewords of C with length L_(k), and R=the number of different codeword lengths in C, said generating step 11 creating a set W of n-bit long words distant of d;

(3) listing and storing (step 21) in the set W all the possible L₁-tuples at the distance of d_(min) from the codewords of C (said distance d_(min) for a VLEC code C being the minimum value of all the diverging distances between all possible couples of different-length codewords of C), and, if said set W is not empty, doubling the number of words in W by affixing at the end of all words one extra bit, said storing step therefore replacing the set W by a new one having twice more words than the previous one and the length of each one of these words being L₁+1;

(4) deleting (step 31) all the words of the set W that do not satisfy the c_(min) distance with all codewords of C, said distance C_(min) being the minimum converging distance of the code C;

(5) in the case where no word is found or the maximum number of bits is reached, reducing (step 41) the constraint of distance for finding more words;

(6) controlling that all words of the set W are distant of b_(min), the found words being then added to the code C (step 34);

(7) if (step 35) the required number of codewords has not been reached, repeating the steps (1) to (6) (i.e. the steps 21 to 35) until the method finds either no further possibility to continue or the required number of codewords;

(8) if the number of codewords of C is greater than S, calculating (operation A4), on the basis of the structure of the VLEC code, the average length AL obtained by weighting each codeword length with the probability of the source, said AL becoming the AL_(min), if it is lower than AL_(min), with AL_(min)=the minimum value of AL, and the corresponding code structure being kept in memory;

said building method being moreover such that at most one bit is added at the end of each word of the set W.

Simulations show that, with the classical Heuristic method, almost none of the obtained best codes has a hole (i.e. a length jump in its structure length). It is then considered, in the previously cited European patent application, that most good codes do not have jump of length and, therefore, that the set of examined VLEC codes can be reduced accordingly (which reduces the simulation time and the complexity of implementation of the method, without modifying much the AL). Following this hypothesis, the method has been, according to said European patent application, modified by avoiding to add more than one bit at the end of each word of the set W. The corresponding implementation (improved Heuristic construction method, also called “noHole optimization” method) is illustrated in FIGS. 10 and 11, which show the two parts of a flowchart corresponding to said method (the elements that are identical to the ones observed in FIGS. 2 to 4 being designated with the same references). With respect to the flowchart of FIGS. 2 to 4, the parts that, with respect to the classical Heuristic technique, are useless for the implementation of the improved method have been cancelled:

(a) if W is empty at the end of the step 31 (reply YES to the test 32: |W|=0?), the next phase is now (see FIG. 10) not the repetition of the steps (23, 24, 31, 32), but, according to said “noHole” method, the establishment (in place of said repetition) of a direct connection 91 towards the input of the circuit carrying out the operation 55 (deletion of some codewords, or of the best one, before a repetition of the steps 21 to 24 and 31 to 35), said operation 55 being then, as previously, followed by the operations 21 and following.

(b) the fourth phase of the method is now reduced to one step, the operation 41, which is the test “Number of codewords in last group=1?”. If the reply is NO, a direct link is established with the input of the step 55 (connection 91), in view of carrying out said operation 55, and then the operations 21 and following. If the reply is YES, a connection 92 is established with the input of the set of operations 52 to 54.

The results thus obtained are presented in the table of FIG. 12 for the 26 symbol English source when using the GAS method for selecting codewords. It can be seen, when comparing with results presented in FIG. 13, that although the result is not completely optimal for d_(free)=3 (the code structure has a hole at length L=11), the AL rise is really acceptable when one considers that there is both strictly no degradation for the other d_(free) values and a gain of time between 2, 5 and 4. The same remarks can be applied when comparing the present solution with the ones obtained in FIG. 7, where the MVA complexity effect is clear. Similarly, applying the noHole optimisation with the GA method for selecting codewords leads to a time gain at the only expense of a slight AL rise for d_(free)=3. Finally, FIG. 5 shows on the other hand that the current solution offers better AL for an acceptable gain of time, the noHole optimisation compensating almost entirely the complexity induced by the GAS.

However, with the method thus described in said European patent application, there are cases where there are too many small length codewords in the generated VLEC code. It has then been proposed, in another European patent application filed on Mar. 11, 2003, with the filing number 03290604.2 (PHFR030026), another improved building method according to which the group deletion is not only performed with the last obtained codewords group, but more generally with groups up to a given length value group, in order to make possible to go back directly, and therefore very quickly, to smaller lengths, i.e. to skip many algorithm steps in cases where there are too many small length codewords. More precisely, denoting by L_(s) (with s for: skip) the length to which the algorithm will skip back to in the codeword deletion stage, it has been proposed to skip parts of the original Heuristic algorithm by carefully jumping to lower lengths when looking for codewords to be deleted (however, when the considered codewords group length L is smaller than a preset value L_(s), it is obviously better to apply the previous method, and the deletion is then done within the group of length L). The length comprised between L₁ and L_(s) are consequently called “free lengths”, i.e. lengths with a freedom degree, as they are decremented one by one in the search process (when the number of free lengths grows up, the simulation time also increased, exponentially). This method, called “L_(s) optimization adding”, is depicted in the flowchart formed by the association of FIG. 10 (unchanged part of the previous method, the so-called noHole optimization method) and FIG. 14 (modified part of the noHole optimization method).

Said FIG. 14 is adapted from FIG. 11 according to the following indications. The last added group of the current code is deleted, but only if (test 61) the codeword length of this previous group is (reply NO to the test 61) lower than or equal to L_(s) (the steps that follow the test 61 are then the same as previously: steps 53, 54, and 55 or 52 at the output of the test 54). If said codeword length is greater than L_(s) (reply YES to the test 61), an additional step 62 is provided for going to group with L_(s)-bit long codewords and deleting all groups with more than L_(s) bits. At the output of the step 62, the same steps 54, 55 as previously are provided. In practice, simulation results show that good compression rates can be obtained for L_(s)<L(max), where L(max) is the maximal authorized codeword length (it can be noted that increasing the value of L_(s) results in an improvement of the AL value until a constant floor—the best value—is reached, and this behaviour then suggests a possible dynamic choice of L_(s), starting with L_(s)=L₁ and incrementing it until said floor is reached). It seems however that, unfortunately, said L_(s) optimization method may be not consequent enough to decrease the computation time in all situations.

SUMMARY OF THE INVENTION

It is therefore an object of the invention to propose an improved construction method with which this drawback is avoided and better codes can be obtained, with an acceptable computation time.

To this end, the invention relates to a method such as defined in the introductory part of the description and which is moreover characterized in that, considering that all distributions of number of codewords for the best VLEC codes have a similar curve allure of a bell shape type, it is defined an optimal length value Lm until which the number of codewords increases with their length, whereas it decreases after said value Lm, said definition allowing to apply the so-called “Ls optimization” method with avoiding the edges of the curve and to work locally.

According to a possible improved implementation, the invention relates to a similar method (i.e. also such as defined in the introductory part of the description), but which is now preferably characterized in that the deletion is realized not only in the last obtained group but also in the group of a given length value, in order to go back very quickly to smaller lengths, and, considering that all distributions of number of codewords for the best VLEC codes have a similar curve allure of a bell shape type, it is defined an optimal length value Lm until which the number of codewords increases with their length, whereas it decreases after said value Lm, said definition allowing to apply the so-called “Ls optimization” method with avoiding the edges of the curve and to work locally.

It is also an object of the invention to propose a device for carrying out said construction method.

To this end, the invention relates to a device for carrying out a variable length error code building method according to anyone of the two solutions thus proposed.

BRIEF DESCRIPTION OF THE DRAWINGS

The present invention will now be described, by way of example, with reference to the accompanying drawings in which:

FIG. 1 depicts a conventional communication channel;

FIGS. 2 to 4 are the three parts of a single flowchart illustrating the main steps of a conventional method used for building a VLEC code (and called Heuristic method);

FIG. 5 illustrates an algorithm (called greedy algorithm, or GA) used for the initialization of the method of FIGS. 2 to 4, and FIG. 6 is a table giving various VLEC codes for a source constructed with the Heuristic construction using said algorithm of FIG. 5;

FIG. 7 illustrates another algorithm (called majority voting algorithm, or MVA) used for the initialization of the method of FIGS. 2 to 4, and FIG. 8 is another table giving various VLEC codes for a source constructed with the Heuristic construction using said algorithm of FIG. 7;

FIG. 9 is a table giving for the 26-symbol English source the correspondence between the source symbol and its probability;

FIGS. 10 and 11 are the two parts of a single flowchart illustrating an implementation of an improvement of the conventional method illustrated in FIGS. 2 to 4;

FIG. 12 is another table giving various VLEC codes for the same 26 symbol English source as considered in the tables of FIGS. 6 and 8 and using the GAS;

FIG. 13 is another table giving various VLEC codes for the same source as in FIG. 12 and using both the GAS previously mentioned and the building method according to the improvement illustrated in FIGS. 10 and 11,

FIG. 14 shows the modification of the part of flowchart of FIG. 11 according to another improvement of the conventional method illustrated in FIGS. 2 to 4;

FIG. 15 shows, with respect to the single flowchart formed by the association of FIGS. 10 and 14, a modification of the lower part of flowchart of FIG. 10 when the method according to the invention is carried out (only this lower modified part, with respect to the original FIG. 10, is shown);

FIG. 16 is a table illustrating the results obtained for the 26-symbol English source when the previous method of FIG. 14 (“Ls optimization” method) is carried out;

FIG. 17 is a table illustrating the results obtained for the 26-symbol English source when the method according to the invention is carried out.

DETAILED DESCRIPTION OF THE INVENTION

Considering the results of some simulations made on the basis of the classic Heuristic method or the modified ones (“noHole optimization” method, “Ls optimization” method), it appears that all distributions of number of codewords for the best VLEC codes found in said simulations have a similar aspect: the number Nc(L) of codewords at length L versus the codeword length L is a curve generally exhibiting a bell shape. It means that, up until a given length Lm (with m for: middle), the number of codewords increases with the length, whereas, after said length Lm, the number of codewords decreases.

With respect to the single flowchart formed by the association of FIG. 10 and FIG. 14, the previous remark is therefore exploited by means of a modification of the lower part of flowchart of FIG. 10: the method according to the invention is illustrated in FIG. 15, which must be considered together with the remaining upper part of FIG. 10 (as explained in the following paragraph describing how said lower part of FIG. 10 contributes to the implementation of the method according to the invention): and with said FIG. 14 in order to form the new single flowchart corresponding to the implementation of said method. This method, called “Lm optimization”, is an adaptation of the “Ls optimization” method, and this adaptation is done by means of an introduction of the technical measures now described.

According to said measures, a test circuit 71 (“Size of set W?”), a test circuit 72 (“Word length of W?”), and a computing circuit 73 (“Put size of W=size of last group”) are added to the solution shown in FIG. 10, between the circuits 33 et 34: the method is indeed implemented after the circuit 33, where the set W is in accordance with all the different distances, and before the circuit 34, that performs the addition of the words of W to the code C. Between these two circuits 33 and 34, additional tests are carried out according to the invention.

First, one assumes that the word length Lw in W is lower than Lm. To respect the allure of the curve, the size of the set W must not be smaller than the last group one. If said size is smaller than the size of the last group (reply YES to the test 71), the steps 21 to 24 and 31 to 35 must be repeated, as explained above when describing the previous implementations. If said size of W is greater than the size of the last group or if the word length Lw is greater than Lm (reply NO to the test 71), the test 72 is performed.

If the word length Lw is now greater than Lm and lower than L(max)−2, the W size must be lower than the last group one. If it is not true (reply YES to the test 72), the number of words in W is too high and it must be set not more than the last group size, which is done in the circuit 73. Then the words in W are added to C (circuit 34), as previously with the “Heuristic”, “noHole optimization” or “Ls optimization” method. If it is true (W size lower than the last group one: reply NO to the test 72), nothing is done before adding the words in W to the code C (circuit 73). To give some freedom to the method, which will allow to find the code allure with little oscillation, the allure constraint is tested not globally but locally, i.e. the inclination is verified for only two lengths: the length Lw of W and the length L(last_group) of the last group.

By comparing the results obtained with the “Ls optimization” method (table of FIG. 16) and the ones obtained with the present “Lm optimization” method, illustrated in the table of FIG. 17, it appears that the “Lm optimization” gives the same best code with a small gain of time. It can be explained by the fact that sources with a few number of codewords are already quickly dealt with the “Ls optimization” method, the “Lm optimization” one showing its interest especially when there is a higher number of codewords. 

1. A method of building a variable length error code, said method comprising the steps of: (1) initializing the needed parameters: minimum and maximum length of codewords L₁ and L_(max) respectively, free distance d_(free) between each codeword (said distance d_(free) being for a VLEC code C the minimum Hamming distance in the set of all arbitrary extended codes), required number of codewords S; (2) generating a fixed length code C of length L₁ and minimal distance b_(min), with b_(min)=min{b_(k); k=1, 2, . . . , R}, b_(k)=the distance associated to the codeword length L_(k) of code C and defined as the minimum Hamming distance between all codewords of C with length L_(k), and R=the number of different codeword lengths in C, said generating step creating a set W of n-bit long words distant of d; (3) storing in the set W all the possible L₁-tuples distant of d_(min) from the codewords of C (said distance d_(min) for a VLEC code C being the minimum value of all the diverging distances between all possible couples of different-length codewords of C), and, if said set W is not empty, affixing at the end of all words one extra bit, said storing step replacing the set W by a new one having twice more words than the previous one and the length of each one of these words being L₁+1; (4) deleting all the words of the set W that do not satisfy the c_(min) distance with all codewords of C, said distance c_(min) being the minimum converging distance of the code C; (5) in the case where no word is found or the maximum number of bits is reached, reducing the constraint of distance for finding more words; (6) controlling that all words of the set W are distant of b_(min), the found words being then added to the code C; (7) if the required number of codewords has not been reached, repeating the steps (1) to (6) until the method finds either no further possibility to continue or the required number of codewords (8) if the number of codewords of C is greater than S, calculating, on the basis of the structure of the VLEC code, the average length AL obtained by weighting each codeword length with the probability of the source, said AL becoming the AL_(min) if it is lower than AL_(min), with AL_(min)=the minimum value of AL, and the corresponding code structure being kept in memory; said building method being moreover characterized in that, considering that all distributions of number of codewords for the best VLEC codes have a similar curve allure of a bell shape type, it is defined an optimal length value Lm until which the number of codewords increases with their length, whereas it decreases after said value Lm, said definition allowing to apply the so-called “Ls optimization” method with avoiding the edges of the curve and to work locally.
 2. A method of building a variable length error code, said method comprising the steps of: (1) initializing the needed parameters: minimum and maximum length of codewords L₁ and L_(max) respectively, free distance d_(free) between each codeword (said distance d_(free) being for a VLEC code C the minimum Hamming distance in the set of all arbitrary extended codes), required number of codewords S; (2) generating a fixed length code C of length L₁ and minimal distance b_(min), with b_(min)=min{b_(k); k=1, 2, . . . , R}, b_(k)=the distance associated to the codeword length L_(k) of code C and defined as the minimum Hamming distance between all codewords of C with length L_(k), and R=the number of different codeword lengths in C, said generating step creating a set W of n-bit long words distant of d; (3) storing in the set W all the possible L₁-tuples distant of d_(min) from the codewords of C (said distance d_(min) for a VLEC code C being the minimum value of all the diverging distances between all possible couples of different-length codewords of C), and, if said set W is not empty, affixing at the end of all words one extra bit, said storing step replacing the set W by a new one having twice more words than the previous one and the length of each one of these words being L₁+1; (4) deleting all the words of the set W that do not satisfy the c_(min) distance with all codewords of C, said distance c_(min) being the minimum converging distance of the code C; (5) in the case where no word is found or the maximum number of bits is reached, reducing the constraint of distance for finding more words; (6) controlling that all words of the set W are distant of b_(min), the found words being then added to the code C; (7) if the required number of codewords has not been reached, repeating the steps (1) to (6) until the method finds either no further possibility to continue or the required number of codewords; (8) if the number of codewords of C is greater than S, calculating, on the basis of the structure of the VLEC code, the average length AL obtained by weighting each codeword length with the probability of the source, said AL becoming the AL_(min) if it is lower than AL_(min), with AL_(min)=the minimum value of AL, and the corresponding code structure being kept in memory; said building method being moreover characterized in that the deletion is realized not only in the last obtained group but also in the group of a given length value, in order to go back very quickly to smaller lengths, and, considering that all distributions of number of codewords for the best VLEC codes have a similar curve allure of a bell shape type, it is defined an optimal length value Lm until which the number of codewords increases with their length, whereas it decreases after said value Lm, said definition allowing to apply the so-called “Ls optimization” method with avoiding the edges of the curve and to work locally.
 3. A VLEC code building method according to claim 1, in which the optimal value for Lm is Lm=Ls+1.
 4. A device for carrying out a variable length error code building method according to claim
 1. 